If f(x)= int(0)^(x)t sin t dt, then f'(x...

If `f(x)= int_(0)^(x)t sin t dt`, then `f'(x)` is

`cosx+xsinx`

`xsinx`

`xcosx`

`sinx+xcosx`

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ACCURATE PUBLICATION-DEFINITE INTEGRALS-QUESTION CARRYING 1 MARK - TYPE-I

int(0)^(pi)sin^(2)xcos^(3)dx is equal to
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int0^pi sin^3xcos^5xdx is equal to :
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int(0)^(pi//2)(sqrt(cosx)/(sqrt(sinx)+sqrt(cosx)))dx is equal to
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int0^(pi/2) sin^(1/2x)/(sin^(1/2)x+cos^(1/2)x)dx is equal to :
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int0^(pi/2) sin^(3/2x)/(sin^(3/2)x+cos^(3/2)x)dx is equal to :
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int0^(pi/2) sin^(3/2x)/(sin^(3/2)x+cos^(3/2)x)dx is equal to :
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int(0)^(pi//2)(sqrt(cosx)/(sqrt(sinx)+sqrt(cosx)))dx is equal to
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int(0)^(2//3) (dx)/(4+9x^(2)) equals
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The value of the integral int(1/3)^1 (x-x^3)^(1/3)/x^4 dx is :
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If f(x)= int(0)^(x)t sin t dt, then f'(x) is
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If underset0 overset1 int e^t/(1+t)dt=a, then underset0 overset1 int(e...
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